from sage.all import *
-def schur_cone(n):
+def schur_cone(n, lattice=None):
r"""
- Return the Schur cone in ``n`` dimensions.
+ Return the Schur cone in ``n`` dimensions that induces the
+ majorization ordering.
INPUT:
- - ``n`` -- the dimension the ambient space.
+ - ``n`` -- the dimension the ambient space.
+
+ - ``lattice`` -- (default: ``None``) an ambient lattice of rank ``n``
+ to be passed to the :func:`Cone` constructor.
OUTPUT:
- A rational closed convex Schur cone of dimension ``n``.
+ A rational closed convex Schur cone of dimension ``n``. Each
+ generating ray will have the integer ring as its base ring.
+
+ If a ``lattice`` was specified, then the resulting cone will live in
+ that lattice unless its rank is incompatible with the dimension
+ ``n`` (in which case a ``ValueError`` is raised).
REFERENCES:
+ .. [GourionSeeger] Daniel Gourion and Alberto Seeger.
+ Critical angles in polyhedral convex cones: numerical and
+ statistical considerations. Mathematical Programming, 123:173-198,
+ 2010, doi:10.1007/s10107-009-0317-2.
+
.. [IusemSeegerOnPairs] Alfredo Iusem and Alberto Seeger.
On pairs of vectors achieving the maximal angle of a convex cone.
Mathematical Programming, 104(2-3):501-523, 2005,
sage: P = schur_cone(5)
sage: Q = nonnegative_orthant(5)
- sage: G = [ g.change_ring(QQbar).normalized() for g in P ]
- sage: H = [ h.change_ring(QQbar).normalized() for h in Q ]
- sage: actual = max([arccos(u.inner_product(v)) for u in G for v in H])
+ sage: G = ( g.change_ring(QQbar).normalized() for g in P )
+ sage: H = ( h.change_ring(QQbar).normalized() for h in Q )
+ sage: actual = max(arccos(u.inner_product(v)) for u in G for v in H)
sage: expected = 3*pi/4
sage: abs(actual - expected).n() < 1e-12
True
+ The dual of the Schur cone is the "downward monotonic cone"
+ [GourionSeeger]_, whose elements' entries are in non-increasing
+ order::
+
+ sage: n = ZZ.random_element(10)
+ sage: K = schur_cone(n).dual()
+ sage: x = K.random_element()
+ sage: all( x[i] >= x[i+1] for i in range(n-1) )
+ True
+
TESTS:
We get the trivial cone when ``n`` is zero::
The Schur cone induces the majorization ordering::
- sage: set_random_seed()
sage: def majorized_by(x,y):
....: return (all(sum(x[0:i]) <= sum(y[0:i])
....: for i in range(x.degree()-1))
sage: majorized_by(x,y) == ( (y-x) in S )
True
+ If a ``lattice`` was given, it is actually used::
+
+ sage: L = ToricLattice(3, 'M')
+ sage: schur_cone(3, lattice=L)
+ 2-d cone in 3-d lattice M
+
+ Unless the rank of the lattice disagrees with ``n``::
+
+ sage: L = ToricLattice(1, 'M')
+ sage: schur_cone(3, lattice=L)
+ Traceback (most recent call last):
+ ...
+ ValueError: lattice rank=1 and dimension n=3 are incompatible
+
"""
+ if lattice is None:
+ lattice = ToricLattice(n)
+
+ if lattice.rank() != n:
+ raise ValueError('lattice rank=%d and dimension n=%d are incompatible'
+ %
+ (lattice.rank(), n))
def _f(i,j):
if i == j:
# The "max" below catches the trivial case where n == 0.
S = matrix(ZZ, max(0,n-1), n, _f)
- # Likewise, when n == 0, we need to specify the lattice.
- return Cone(S.rows(), ToricLattice(n))
+ return Cone(S.rows(), lattice)
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